On the Structure of Order Domains

Geil, Olav; Pellikaan, Ruud

doi:10.1006/ffta.2001.0347

Cited by 63 publications

(90 citation statements)

References 23 publications

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“…In Matsumoto-Miura [14] this was done by the same Gröbner bases techniques as in this paper. A generalization of these results were obtained by Geil and the author in [8,9].…”

Section: S(fsupporting

confidence: 62%

On the existence of order functions

Pellikaan

2001

Journal of Statistical Planning and Inference

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“…In Matsumoto-Miura [14] this was done by the same Gröbner bases techniques as in this paper. A generalization of these results were obtained by Geil and the author in [8,9].…”

Section: S(fsupporting

confidence: 62%

On the existence of order functions

Pellikaan

2001

Journal of Statistical Planning and Inference

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“…These seems to be the only order functions that are relevant for coding theoretical purposes. From [6] we have the following definition and theorem.…”

Section: Codes From Order Domainsmentioning

confidence: 99%

“…Another interpretation was given by Høholdt, van Lint and Pellikaan in [8]. Here they introduced the concept of an order function acting on what is known today as an order domain ( [6]). They reformulated some of the most important results by Feng and Rao into this new setting.…”

Section: Introductionmentioning

confidence: 99%

On the Feng-Rao Bound for Generalized Hamming Weights

Geil

Thommesen

2006

Applied Algebra, Algebraic Algorithms and Error-Correcting Codes

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“…The construction of such codes appears in [11], in which the generators of the corresponding value monoid are computed for a specific example. An alternative description of this construction is given in [3], and we provide more commentary in an example at the end of this paper. Following this example, we pose an open question.…”

Section: Introductionmentioning

confidence: 99%

The growth of valuations on rational function fields in two variables

Mosteig

Sweedler

2004

Proc. Amer. Math. Soc.

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Abstract. Given a valuation on the function field k(x, y), we examine the set of images of nonzero elements of the underlying polynomial ring k [x, y] under this valuation. For an arbitrary field k, a Noetherian power series is a map z : Q → k that has Noetherian (i.e., reverse well-ordered) support. Each Noetherian power series induces a natural valuation on k(x, y). Although the value groups corresponding to such valuations are well-understood, the restrictions of the valuations to underlying polynomial rings have yet to be characterized. Let Λn denote the images under the valuation v of all nonzero polynomials f ∈ k [x, y] of at most degree n in the variable y. We construct a bound for the growth of Λn with respect to n for arbitrary valuations, and then specialize to valuations that arise from Noetherian power series. We provide a sufficient condition for this bound to be tight.

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On the Structure of Order Domains

Cited by 63 publications

References 23 publications

On the existence of order functions

On the existence of order functions

On the Feng-Rao Bound for Generalized Hamming Weights

The growth of valuations on rational function fields in two variables

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